FriCAS? can now handle large class of integrals expressible in terms of exponential
integral, error functions, incomplete Gamma function with rational
first argument, logarithmic integral and polylogarithms. Like
fricas
integrate(1/log(x), x)
Type: Union(Expression(Integer),...)
fricas
integrate(1/(log(x) + 1), x)
Type: Union(Expression(Integer),...)
fricas
integrate(1/(log(x)^2-1), x)
Type: Union(Expression(Integer),...)
fricas
integrate(exp(x + a)/x, x)
Type: Union(Expression(Integer),...)
fricas
integrate(exp(x + a)/x^2, x)
Type: Union(Expression(Integer),...)
fricas
integrate(exp(x)/(x^2 - 1), x)
Type: Union(Expression(Integer),...)
fricas
integrate(x/(exp(x) - 1), x)
Type: Union(Expression(Integer),...)
fricas
integrate(x^3/(exp(x) - 1), x)
Type: Union(Expression(Integer),...)
fricas
integrate(2*x*exp(x)/(exp(x)^2 - 1), x)
Type: Union(Expression(Integer),...)
fricas
integrate(x/sinh(x), x)
Type: Union(Expression(Integer),...)
fricas
integrate(log(sinh(x)), x)
Type: Union(Expression(Integer),...)
fricas
integrate(exp((-x^2-2*x-1)/x^2)/x^2, x)
Type: Union(Expression(Integer),...)
fricas
integrate(x^3*exp(-x^3), x)
Type: Union(Expression(Integer),...)
fricas
integrate(x^2*exp(-(x+1)^3), x)
Type: Union(Expression(Integer),...)
FriCAS? can introduce new algebraic constants when needed:
fricas
integrate(1/(log(x)^2-3), x)
Type: Union(Expression(Integer),...)
fricas
integrate(exp(x)/(x^2 - 5), x)
Type: Union(Expression(Integer),...)
The method is robust, FriCAS? can handle both
fricas
integrate(((x+1)*exp(x))/log(x*exp(x)), x)
Type: Union(Expression(Integer),...)
fricas
integrate(((x+1)*exp(x))/(x + log(x)), x)
Type: Union(Expression(Integer),...)
while Mathematca 8 can handle the first form, but not the second one
(Maple 15 and Maxima 5.30.0 can not handle any).
Similarly FriCAS? has no troubles with
fricas
integrate(((-4*x-8)*log(x)+(-2*x^2-4*x))/(3*x*exp(2*log(x)+x)^2-x), x)
Type: Union(Expression(Integer),...)
fricas
integrate(((-4*x-8)*log(x)+(-2*x^2-4*x))/(3*x^3*exp(log(x)+x)^2-x), x)
Type: Union(Expression(Integer),...)
fricas
integrate(((2*x^4-x^3+3*x^2+2*x+2)*exp(x/(x^2+2)))/(x^3+2*x), x)
Type: Union(Expression(Integer),...)
none of Mathematca 8, Maple 15 and Maxima 5.30.0 can handle them.
Since FriCAS? uses algorithmic approach some integrals can be done easily without any extra special
support. For example:
fricas
)set output tex off
fricas
)set output algebra on
integrate(-erf(((2*m - k^2) - 2*log(c + b) + 2*log(a))/(2*sqrt(2)*k))/2 - 1/2, c)
(22)
+---+
2 | 1
(2log(c + b) - 2log(a) - 2m - k ) |---
| 2
+-+ \|2k log(a) + m
- \|2 erf(---------------------------------------)%e
2
+
+---+
2 | 1
(2log(c + b) - 2log(a) - 2m + k ) |---
| 2
+-+ \|2k
b\|2 erf(---------------------------------------)
2
+
+---+ 2 +---+
| 1 2log(c + b) - 2log(a) - 2m + k | 1
2c k |--- erf(-------------------------------) - 2c k |---
| 2 +-+ | 2
\|2k 2k\|2 \|2k
/
+---+
| 1
4k |---
| 2
\|2k
Type: Union(Expression(Integer),...)
fricas
)set output tex on
fricas
)set output algebra off
is done combining general support for Liouvillian integrands with procedure for handling erf.
In Rubi this example required adding a new special rule.
FriCAS? can also handle some integrals involving special functions of
algebraic arguments:
fricas
integrate(((26*x+23)*x^(1/2)+4*x^2+50*x-6)*exp(2*x^(1/2)+x)/((16*x^2+36*x)*x^(1/2)+(2*x^3+42*x^2)), x)
Type: Union(Expression(Integer),...)
![\label{eq8}{\left(
\begin{array}{@{}l}
\displaystyle
{{24}\ {polylog \left({4, \:{{e}^{x}}}\right)}}-{{24}\ x \ {polylog \left({3, \:{{e}^{x}}}\right)}}+
\
\
\displaystyle
{4 \ {{x}^{3}}\ {\log \left({-{{e}^{x}}+ 1}\right)}}+{{12}\ {{x}^{2}}\ {dilog \left({-{{e}^{x}}+ 1}\right)}}-{{x}^{4}}](images/4654315367562053491-16.0px.png "\label{eq8}{\left(
\begin{array}{@{}l}
\displaystyle
{{24}\ {polylog \left({4, \:{{e}^{x}}}\right)}}-{{24}\ x \ {polylog \left({3, \:{{e}^{x}}}\right)}}+
\
\
\displaystyle
{4 \ {{x}^{3}}\ {\log \left({-{{e}^{x}}+ 1}\right)}}+{{12}\ {{x}^{2}}\ {dilog \left({-{{e}^{x}}+ 1}\right)}}-{{x}^{4}}")
![\label{eq9}\begin{array}{@{}l}
\displaystyle
-{x \ {\log \left({{{e}^{x}}+ 1}\right)}}+{x \ {\log \left({-{{e}^{x}}+ 1}\right)}}-{dilog \left({{{e}^{x}}+ 1}\right)}+
\
\
\displaystyle
{dilog \left({-{{e}^{x}}+ 1}\right)}](images/7066491328643873092-16.0px.png "\label{eq9}\begin{array}{@{}l}
\displaystyle
-{x \ {\log \left({{{e}^{x}}+ 1}\right)}}+{x \ {\log \left({-{{e}^{x}}+ 1}\right)}}-{dilog \left({{{e}^{x}}+ 1}\right)}+
\
\
\displaystyle
{dilog \left({-{{e}^{x}}+ 1}\right)}")
![\label{eq10}\begin{array}{@{}l}
\displaystyle
-{x \ {\log \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}}+
\
\
\displaystyle
{x \ {\log \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}}-
\
\
\displaystyle
{dilog \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}+
\
\
\displaystyle
{dilog \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}](images/7763692248926390899-16.0px.png "\label{eq10}\begin{array}{@{}l}
\displaystyle
-{x \ {\log \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}}+
\
\
\displaystyle
{x \ {\log \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}}-
\
\
\displaystyle
{dilog \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}+
\
\
\displaystyle
{dilog \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}")
![\label{eq11}{\left(
\begin{array}{@{}l}
\displaystyle
-{2 \ x \ {\log \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}}+{2 \ x \ {\log \left({\sinh \left({x}\right)}\right)}}-
\
\
\displaystyle
{2 \ x \ {\log \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}}-
\
\
\displaystyle
{2 \ {dilog \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}}-
\
\
\displaystyle
{2 \ {dilog \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}}+{{x}^{2}}](images/6513384414318913413-16.0px.png "\label{eq11}{\left(
\begin{array}{@{}l}
\displaystyle
-{2 \ x \ {\log \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}}+{2 \ x \ {\log \left({\sinh \left({x}\right)}\right)}}-
\
\
\displaystyle
{2 \ x \ {\log \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}}-
\
\
\displaystyle
{2 \ {dilog \left({{\sinh \left({x}\right)}+{\cosh \left({x}\right)}+ 1}\right)}}-
\
\
\displaystyle
{2 \ {dilog \left({-{\sinh \left({x}\right)}-{\cosh \left({x}\right)}+ 1}\right)}}+{{x}^{2}}")
![\label{eq14}{\left(
\begin{array}{@{}l}
\displaystyle
{2 \ {\Gamma \left({{2 \over 3}, \:{{{x}^{3}}+{3 \ {{x}^{2}}}+{3 \ x}+ 1}}\right)}}-
\
\
\displaystyle
{\Gamma \left({{1 \over 3}, \:{{{x}^{3}}+{3 \ {{x}^{2}}}+{3 \ x}+ 1}}\right)}-
\
\
\displaystyle
{{e}^{-{{x}^{3}}-{3 \ {{x}^{2}}}-{3 \ x}- 1}}](images/1965132046550253456-16.0px.png "\label{eq14}{\left(
\begin{array}{@{}l}
\displaystyle
{2 \ {\Gamma \left({{2 \over 3}, \:{{{x}^{3}}+{3 \ {{x}^{2}}}+{3 \ x}+ 1}}\right)}}-
\
\
\displaystyle
{\Gamma \left({{1 \over 3}, \:{{{x}^{3}}+{3 \ {{x}^{2}}}+{3 \ x}+ 1}}\right)}-
\
\
\displaystyle
{{e}^{-{{x}^{3}}-{3 \ {{x}^{2}}}-{3 \ x}- 1}}")
![\label{eq19}\begin{array}{@{}l}
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}+
\
\
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}-
\
\
\displaystyle
{dilog \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}-
\
\
\displaystyle
{dilog \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}+{4 \ {{\log \left({x}\right)}^{2}}}+{4 \ x \ {\log \left({x}\right)}}+
\
\
\displaystyle
{{x}^{2}}](images/3497054770664335985-16.0px.png "\label{eq19}\begin{array}{@{}l}
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}+
\
\
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}-
\
\
\displaystyle
{dilog \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}-
\
\
\displaystyle
{dilog \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}+{4 \ {{\log \left({x}\right)}^{2}}}+{4 \ x \ {\log \left({x}\right)}}+
\
\
\displaystyle
{{x}^{2}}")
![\label{eq20}\begin{array}{@{}l}
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}+
\
\
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}-
\
\
\displaystyle
{dilog \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}-
\
\
\displaystyle
{dilog \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}+{4 \ {{\log \left({x}\right)}^{2}}}+{4 \ x \ {\log \left({x}\right)}}+
\
\
\displaystyle
{{x}^{2}}](images/4168568194982341327-16.0px.png "\label{eq20}\begin{array}{@{}l}
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}+
\
\
\displaystyle
{{\left(-{2 \ {\log \left({x}\right)}}- x \right)}\ {\log \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}}-
\
\
\displaystyle
{dilog \left({{{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}-
\
\
\displaystyle
{dilog \left({{-{3 \ {{e}^{{2 \ {\log \left({x}\right)}}+ x}}}+{\sqrt{3}}}\over{\sqrt{3}}}\right)}+{4 \ {{\log \left({x}\right)}^{2}}}+{4 \ x \ {\log \left({x}\right)}}+
\
\
\displaystyle
{{x}^{2}}")
