Revision as of 16:29, 25 May 2021

This page presents the results of the publication: Comparative Verification of the Digital Library of Mathematical Functions and Computer Algebra Systems.

Bug Reports

You can find a PDF with commands that illustrate the encountered errors in Mathematica here: File:Mathematica Bugs Overview.pdf

We provide the same file in the Wolfram system notebook format (NB) here: File:Mathematica Bugs Notebook File.nb

DLMF Translations and Results

This section explains the data you can access. Below, you will find a large table that shows the overall results of translations, symbolic and numeric verifications, as well as a number of errors and aborted calculations for each DLMF chapter. Before you move on to investigating the results, please have a look at how to read the data first.

How to read the data?

The data on this website can be considered as an extension of the DLMF but not a copy. Some labeled equations in the DLMF do not appear in this data because they were skipped or caused translation errors in both systems (Maple and Mathematica). In addition, the result tables on this website do not provide context! For checking the context, every equation in our dataset is linked directly to the equation in the DLMF. You can access the original DLMF equation by clicking on the label in the most-left column in the result tables.

You can access the results by clicking on a particular chapter below. This will load a large table presenting our results for that particular chapter of the DLMF. Since most of these tables are relatively large, it may take a few moments until they are fully loaded. Below you see an example of the results with just two equations from different chapters. As you can see, the first entry 4.12.E1 is grayed out. This happens when the entry was skipped due to missing semantic macros in the source of the test case (flagged as Skipped - no semantic math). You can see the actual semantic LaTeX source of every test case below the equation. Since most of these cases are not translated properly by LCT, we skipped them directly, i.e., they were not further processed for symbolic or numeric evaluations. In fact, those cases have not even been translated into our pipeline. However, we added the translations for them to our result tables because they may provide further interesting insights into the translation process.

The most-right columns in the table show the numeric evaluation results. If an equation was not numerically verified, it shows Failed [x/y] where Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle x} is the number of failed calculations and Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle y} is the number of all test calculations for this test case. As you can see in the second entry below 11.5.E2, 15 test calculations failed out of 25, so 10 were successful. When you click on the little Expand, we show the first couple of results for the failed test cases. Since the tables are already very large, we cannot show all failed test calculations.

Clicking on expand for the second entry in our example table below, we see the test result and the test values that produced this result. As explained in the paper, the calculation was simply performed on the difference of the left- and right-hand side of the equation LHS - RHS. Further explanations on why this test failed can be found in the paper.

Failed [15 / 25]

Result: Complex[0.9495382353861556, -0.46093572348323536]
Test Values: {Rule[z, Power[E, Times[Complex[0, Rational[1, 6]], Pi]]], Rule[ν, 1.5]}

Result: Complex[0.7706973036767981, -0.20650772012904173]
Test Values: {Rule[z, Power[E, Times[Complex[0, Rational[1, 6]], Pi]]], Rule[ν, 0.5]}

... skip entries to safe data

DLMF	Formula	Constraints	Maple	Mathematica	Symbolic Maple	Symbolic Mathematica	Numeric Maple	Numeric Mathematica
4.12.E1	Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle \phi(x+1) = e^{\phi(x)}} `\phi(x+1) = e^{\phi(x)}`	Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle -1 < x, x < \infty}	phi(x + 1) = exp(phi(x))	\[Phi][x + 1] == Exp[\[Phi][x]]	Skipped - no semantic math	Skipped - no semantic math	-	-
11.5.E2	Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle \StruveK{\nu}@{z} = \frac{2(\tfrac{1}{2}z)^{\nu}}{\sqrt{\pi}\EulerGamma@{\nu+\tfrac{1}{2}}}\int_{0}^{\infty}e^{-zt}(1+t^{2})^{\nu-\frac{1}{2}}\diff{t}} `\StruveK{\nu}@{z} = \frac{2(\tfrac{1}{2}z)^{\nu}}{\sqrt{\pi}\EulerGamma@{\nu+\tfrac{1}{2}}}\int_{0}^{\infty}e^{-zt}(1+t^{2})^{\nu-\frac{1}{2}}\diff{t}`	Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle \realpart@@{z} > 0, \realpart@@{(\nu+\tfrac{1}{2})} > 0, \realpart@@{(\nu+k+1)} > 0, \realpart@@{((-\nu)+k+1)} > 0, \realpart@@{(n+\nu+\tfrac{3}{2})} > 0}	StruveH(nu, z) - BesselY(nu, z) = (2((1)/(2)z)^(nu))/(sqrt(Pi)GAMMA(nu +(1)/(2)))int(exp(- zt)(1 + (t)^(2))^(nu -(1)/(2)), t = 0..infinity)	StruveH[\[Nu], z] - BesselY[\[Nu], z] == Divide[2(Divide[1,2]z)^\[Nu],Sqrt[Pi]Gamma[\[Nu]+Divide[1,2]]]Integrate[Exp[- zt](1 + (t)^(2))^(\[Nu]-Divide[1,2]), {t, 0, Infinity}, GenerateConditions->None]	Successful	Successful	-	Failed [15 / 25] Result: Complex[0.9495382353861556, -0.46093572348323536] Test Values: {Rule[z, Power[E, Times[Complex[0, Rational[1, 6]], Pi]]], Rule[ν, 1.5]} Result: Complex[0.7706973036767981, -0.20650772012904173] Test Values: {Rule[z, Power[E, Times[Complex[0, Rational[1, 6]], Pi]]], Rule[ν, 0.5]} ... skip entries to safe data

As a summary, here is an explanation for every column of the result tables.

DLMF: Contains the equation label as a link to the actual equation in the DLMF. Click on the label if you need to check the context of a formula in the DLMF.
Formula: Contains the rendered equation of the equation and the actual semantic LaTeX source (sometimes also referred to as content-tex). More information about the semantic (or content) LaTeX can be found in REF-TODO
Constraints: This shows the constraints that LCT has generated by analyzing the definitions of the functions that are included in the equation. This also includes the constraints that are directly attached to a test case. For example, 11.5.E2 only has the constraint Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle \realpart@@{z} > 0} as one can see in the DLMF. LCT followed the definitions of the involved functions and identified several more constraints for this test case. A detailed explanation of this process was given in the paper. Note, however, that this list of constraints does not contain the manually global constraints we applied for all test cases (Table 3 in the paper).
Maple: The translation to Maple
Mathematica: The translations to Mathematica
Symbolic (Maple / Mathematica): The result of the symbolic evaluation. If this was skipped, no calculations have been performed on the test case.
Numeric (Maple / Mathematica): The result of the numeric evaluation as explained above and in the paper.

Links to the data

In the following, we present an overview of the translations of the DLMF equations to the CAS Maple and Mathematica.

DLMF	Formula	Translations Maple	Translations Mathematica	Symbolic Evaluation Maple	Symbolic Evaluation Mathematica	Numeric Evaluation Maple	Numeric Evaluation Mathematica
DLMF	6,545	4,114 (62.9%)	4,713 (72.0%)	1,084 (26.3%)	1,235 (26.2%)	698 (26.7%)	784 (22.6%)

The following links provide access to all results for each DLMF chapter. Since the pages are quite large, it may take some seconds until they are fully loaded.

Translations and Evaluations Overview Table

	Meaning
2C	Chapter Code
S	Successful
%	Percentage
F	Fail
P/T	Partially / Totally Failed
A	Aborted
E	Errors
Base	The baseline performance of the translator
Maple	The CAS Maple 2020
Mathematica	The CAS Mathematica

					Symbolic						Numeric
Formulae		Translations			Maple			Mathematica			Maple						Mathematica
2C	Total	Base	Maple	Math	S	%	F	S	%	F	S	%	F	[P/T]	A	E	S	%	F	[P/T]	A	E
1. AL	227	60	102	103	36	35.3%	60	34	33.0%	69	14	23.3%	35	[ 12 / 23]	7	4	14	20.3%	40	[ 9 / 31]	11	4
2. AS	136	33	65	65	6	9.2%	47	6	9.2%	59	7	14.9%	33	[ 5 / 28]	1	5	4	6.8%	38	[ 6 / 32]	7	9
3. NM	53	36	40	40	6	15.0%	31	5	12.5%	35	1	3.2%	27	[ 9 / 18]	0	2	0	0.0%	29	[ 8 / 21]	6	0
4. EF	569	353	494	564	270	54.7%	221	304	53.9%	260	88	39.8%	126	[ 64 / 62]	0	6	110	42.3%	146	[ 55 / 91]	2	0
5. GA	144	38	130	139	41	31.5%	76	65	46.8%	74	39	51.3%	25	[ 12 / 13]	4	8	30	40.5%	20	[ 9 / 11]	13	9
6. EX	107	21	56	77	13	23.2%	43	18	23.4%	59	10	23.2%	31	[ 13 / 18]	0	2	23	39.0%	32	[ 6 / 26]	4	0
7. ER	149	35	101	120	52	51.5%	47	45	37.5%	75	21	44.7%	23	[ 10 / 13]	2	1	21	28.0%	43	[ 13 / 30]	9	1
8. IG	204	84	160	163	51	31.9%	102	65	39.9%	98	27	26.5%	61	[ 20 / 41]	9	5	22	22.4%	44	[ 19 / 25]	16	15
9. AI	235	36	180	179	54	30.0%	124	69	38.5%	110	34	27.4%	75	[ 41 / 34]	4	8	30	27.3%	58	[ 38 / 20]	14	7
10. BS	653	143	392	486	80	20.4%	209	115	23.7%	371	86	41.1%	59	[ 41 / 18]	52	12	90	24.2%	151	[ 57 / 94]	92	18
11. ST	124	48	121	112	39	32.2%	73	36	32.1%	76	25	34.2%	40	[ 14 / 26]	3	5	21	27.6%	33	[ 8 / 25]	10	11
12. PC	106	33	79	90	25	31.6%	50	18	20.0%	72	15	30.0%	24	[ 15 / 9]	11	0	13	18.0%	43	[ 15 / 28]	12	3
13. CH	260	126	252	254	75	29.8%	143	69	27.2%	185	14	9.8%	90	[ 55 / 35]	37	2	23	12.4%	95	[ 59 / 36]	45	21
14. LE	238	166	230	229	30	13.0%	163	30	13.1%	199	40	24.5%	93	[ 57 / 36]	18	12	59	29.6%	92	[ 54 / 38]	41	5
15. HY	206	148	198	197	46	23.2%	115	53	26.9%	144	17	14.8%	52	[ 34 / 18]	23	23	23	16.0%	77	[ 52 / 25]	29	6
16. GH	53	20	23	25	3	13.0%	16	2	8.0%	23	1	6.2%	9	[ 8 / 1]	6	0	1	4.3%	10	[ 7 / 3]	9	2
17. QH	175	1	53	124	23	43.4%	24	6	4.8%	118	0	0.0%	0	[ 0 / 0]	1	23	13	11.0%	57	[ 52 / 5]	39	5
18. OP	468	132	235	288	65	27.6%	148	101	35.1%	185	67	45.3%	50	[ 32 / 18]	14	17	45	24.3%	68	[ 31 / 37]	52	12
19. EL	516	103	252	416	39	15.5%	192	51	12.2%	365	18	9.4%	123	[ 44 / 79]	34	17	18	4.9%	264	[ 49 / 215]	61	15
20. TH	128	52	98	98	10	10.2%	68	1	1.0%	97	0	0.0%	32	[ 17 / 15]	20	16	33	34.0%	40	[ 25 / 15]	24	0
21. MT	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-
22. JA	264	115	232	238	46	19.8%	176	30	12.6%	206	20	11.4%	116	[ 25 / 91]	36	4	22	10.7%	131	[ 39 / 92]	51	0
23. WE	164	7	19	34	1	5.3%	16	4	11.8%	30	0	0.0%	14	[ 2 / 12]	1	1	2	6.7%	23	[ 9 / 14]	2	3
24. BP	175	31	117	148	15	12.8%	101	23	15.5%	125	67	66.3%	32	[ 19 / 13]	1	1	78	62.4%	33	[ 22 / 11]	14	0
25. ZE	154	28	124	120	19	15.3%	90	48	40.0%	72	43	47.8%	29	[ 18 / 11]	10	8	22	30.5%	22	[ 6 / 16]	22	3
26. CM	136	31	78	87	20	25.6%	50	19	21.8%	68	30	60.0%	11	[ 8 / 3]	2	7	44	64.7%	18	[ 10 / 8]	5	1
27. NT	79	5	26	15	3	11.5%	17	6	40.0%	9	2	11.8%	6	[ 3 / 3]	0	8	3	33.3%	6	[ 3 / 3]	0	0
28. MA	267	52	97	110	7	7.2%	80	7	6.4%	103	6	7.5%	32	[ 12 / 20]	26	15	3	2.9%	48	[ 13 / 35]	33	17
29. LA	111	11	23	22	0	0.0%	21	0	0.0%	22	0	0.0%	19	[ 2 / 17]	0	2	0	0.0%	21	[ 1 / 20]	0	1
30. SW	71	14	19	26	0	0.0%	18	0	0.0%	26	0	0.0%	18	[ 5 / 13]	0	0	0	0.0%	19	[ 2 / 17]	5	1
31. HE	35	29	22	15	5	22.7%	13	2	13.3%	13	2	15.4%	10	[ 0 / 10]	0	1	0	0.0%	8	[ 0 / 8]	5	0
32. PT	67	43	57	57	3	5.3%	51	3	5.3%	54	1	2.0%	44	[ 7 / 37]	4	2	0	0.0%	41	[ 2 / 39]	8	5
33. CW	108	21	14	11	1	7.1%	13	0	0.0%	11	0	0.0%	5	[ 2 / 3]	0	8	0	0.0%	11	[ 2 / 9]	0	0
34. TJ	57	0	1	37	0	0.0%	1	0	0.0%	37	0	0.0%	1	[ 0 / 1]	0	0	14	37.8%	10	[ 5 / 5]	13	0
35. FM	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-	-
36. IC	106	12	24	24	0	0.0%	19	0	0.0%	24	3	15.8%	12	[ 1 / 11]	3	1	3	12.5%	13	[ 1 / 12]	1	6
Failed to parse (LaTeXML (experimental; uses MathML): Invalid response ("") from server "http://latexml:8080/convert/":): {\displaystyle \sum}	6545	2067	4114	4713	1084	26.3%	2618	1235	26.2%	3474	698	26.7%	1357	[607 / 750]	329	226	784	22.6%	1784	[687 / 1097]	655	180

@@ Line 82: / Line 82: @@
 # [[Results of Asymptotic Approximations|Asymptotic Approximations]]
 # [[Results of Numerical Methods|Numerical Methods]]
-# [[Results of Elementary Functions I|Elementary Functions I]] & [[Results of Elementary Functions II|Elementary Functions II]]
+# [[Results of Elementary Functions|Elementary Functions]]
 # [[Results of Gamma Function|Gamma Function]]
 # [[Results of Exponential, Logarithmic, Sine, and Cosine Integrals|Exponential, Logarithmic, Sine, and Cosine Integrals]]
@@ Line 88: / Line 88: @@
 # [[Results of Incomplete Gamma and Related Functions|Incomplete Gamma and Related Functions]]
 # [[Results of Airy and Related Functions|Airy and Related Functions]]
-# [[Results of Bessel Functions I|Bessel Functions I]] & [[Results of Bessel Functions II|Bessel Functions II]] & [[Results of Bessel Functions III|Bessel Functions III]]
+# [[Results of Bessel Functions|Bessel Functions]]
 # [[Results of Struve and Related Functions|Struve and Related Functions]]
 # [[Results of Parabolic Cylinder Functions|Parabolic Cylinder Functions]]
-# [[Results of Confluent Hypergeometric Functions I|Confluent Hypergeometric Functions I]] & [[Results of Confluent Hypergeometric Functions II|Confluent Hypergeometric Functions II]]
+# [[Results of Confluent Hypergeometric Functions|Confluent Hypergeometric Functions]]
-# [[Results of Legendre and Related Functions I|Legendre and Related Functions I]] & [[Results of Legendre and Related Functions II|Legendre and Related Functions II]]
+# [[Results of Legendre and Related Functions|Legendre and Related Functions]]
-# [[Results of Hypergeometric Function I|Hypergeometric Function I]] & [[Results of Hypergeometric Function II|Hypergeometric Function II]]
+# [[Results of Hypergeometric Function I|Hypergeometric Function]]
 # [[Results of Generalized Hypergeometric Functions and Meijer G-Function|Generalized Hypergeometric Functions and Meijer ''G''-Function]]
 # [[Results of q-Hypergeometric and Related Functions|''q''-Hypergeometric and Related Functions]]
-# [[Results of Orthogonal Polynomials I|Orthogonal Polynomials I]] & [[Results of Orthogonal Polynomials II|Orthogonal Polynomials II]]
+# [[Results of Orthogonal Polynomials|Orthogonal Polynomials]]
-# [[Results of Elliptic Integrals I|Elliptic Integrals I]] & [[Results of Elliptic Integrals II|Elliptic Integrals II]]
+# [[Results of Elliptic Integrals|Elliptic Integrals]]
 # [[Results of Theta Functions|Theta Functions]]
 # [[Results of Multidimensional Theta Functions|Multidimensional Theta Functions]]
@@ Line 203: / Line 203: @@
 ||   0 ||  0.0% ||  29 || [  8 /  21] ||   6 ||   0
 |-
-! scope="row" style="text-align: left; border-right: solid 1px #000"|  4. EF [[Results of Elementary Functions I|I]] & [[Results of Elementary Functions II|II]]
+! scope="row" style="text-align: left; border-right: solid 1px #000"|  4. [[Results of Elementary Functions|EF]]
 | style="border-right: solid 1px #000;" | 569
 || 353 || 494
@@ Line 275: / Line 275: @@
 ||  30 || 27.3% ||  58 || [ 38 /  20] ||  14 ||   7
 |-
-! scope="row" style="text-align: left; border-right: solid 1px #000"| 10. BS [[Results of Bessel Functions I|I]] & [[Results of Bessel Functions II|II]] & [[Results of Bessel Functions III|III]]
+! scope="row" style="text-align: left; border-right: solid 1px #000"| 10. [[Results of Bessel Functions|BS]]
 | style="border-right: solid 1px #000;" | 653
 || 143 || 392
@@ Line 311: / Line 311: @@
 ||  13 || 18.0% ||  43 || [ 15 /  28] ||  12 ||   3
 |-
-! scope="row" style="text-align: left; border-right: solid 1px #000"| 13. CH [[Results of Confluent Hypergeometric Functions I|I]] & [[Results of Confluent Hypergeometric Functions II|II]]
+! scope="row" style="text-align: left; border-right: solid 1px #000"| 13. [[Results of Confluent Hypergeometric Functions|CH]]
 | style="border-right: solid 1px #000;" | 260
 || 126 || 252
@@ Line 323: / Line 323: @@
 ||  23 || 12.4% ||  95 || [ 59 /  36] ||  45 ||  21
 |-
-! scope="row" style="text-align: left; border-right: solid 1px #000"| 14. LE [[Results of Legendre and Related Functions I|I]] & [[Results of Legendre and Related Functions II|II]]
+! scope="row" style="text-align: left; border-right: solid 1px #000"| 14. [[Results of Legendre and Related Functions|LE]]
 | style="border-right: solid 1px #000;" | 238
 || 166 || 230
@@ Line 335: / Line 335: @@
 ||  59 || 29.6% ||  92 || [ 54 /  38] ||  41 ||   5
 |-
-! scope="row" style="text-align: left; border-right: solid 1px #000"| 15. HY [[Results of Hypergeometric Function I|I]] & [[Results of Hypergeometric Function II|II]]
+! scope="row" style="text-align: left; border-right: solid 1px #000"| 15. [[Results of Hypergeometric Function|HY]]
 | style="border-right: solid 1px #000;" | 206
 || 148 || 198
@@ Line 371: / Line 371: @@
 ||  13 || 11.0% ||  57 || [ 52 /   5] ||  39 ||   5
 |-
-! scope="row" style="text-align: left; border-right: solid 1px #000"| 18. OP [[Results of Orthogonal Polynomials I|I]] & [[Results of Orthogonal Polynomials II|II]]
+! scope="row" style="text-align: left; border-right: solid 1px #000"| 18. [[Results of Orthogonal Polynomials|OP]]
 | style="border-right: solid 1px #000;" | 468
 || 132 || 235
@@ Line 383: / Line 383: @@
 ||  45 || 24.3% ||  68 || [ 31 /  37] ||  52 ||  12
 |-
-! scope="row" style="text-align: left; border-right: solid 1px #000"| 19. EL [[Results of Elliptic Integrals I|I]] & [[Results of Elliptic Integrals II|II]]
+! scope="row" style="text-align: left; border-right: solid 1px #000"| 19. [[Results of Elliptic Integrals|EL]]
 | style="border-right: solid 1px #000;" | 516
 || 103 || 252

Verifying DLMF with Maple and Mathematica: Difference between revisions

Revision as of 16:29, 25 May 2021

Contents

Bug Reports

DLMF Translations and Results

How to read the data?

Links to the data

Translations and Evaluations Overview Table

Navigation menu

Verifying DLMF with Maple and Mathematica: Difference between revisions

Revision as of 16:29, 25 May 2021

Bug Reports

DLMF Translations and Results

How to read the data?

Links to the data

Translations and Evaluations Overview Table

Navigation menu

Search