2,027 reputation
614
bio website maths.leeds.ac.uk/~jitse
location Leeds, United Kingdom
age 39
visits member for 4 years, 11 months
seen 2 days ago

I am a lecturer in the School of Mathematics at the University of Leeds. My research specialization is numerical analysis (mostly ordinary differential equations, some partial differential equations, some linear algebra). Most of my programming is related to this; in particular I contribute to the Eigen library (linear algebra, C++). I usually program in Python, C++ or MATLAB. I have been using LaTeX from \pm 1994.


Jul
4
comment Eigen Matrix vs Numpy Array multiplication performance
Did you compile with optimizations turned on? That makes a massive difference. On my laptop Eigen takes 0.6 sec and Python almost 10.
Jun
30
answered what does the rows() method do?
Jun
18
comment No copy multiplication in Eigen
operator*() returns an expression object which stands as a proxy for the product, but it does not evaluate the product. The evaluation step is only done inside operator=(), when the product expression object is assigned to a matrix. Search for "expression templates" or "lazy evaluation" in C++ for more info.
Jun
17
answered No copy multiplication in Eigen
May
30
comment Error mixing types with Eigen matrices
Any suggestion on how the documentation could be improved to make this easier to find?
Mar
26
comment How to add an eigen SparseMatrix with an eigen dense Matrix?
This is a bug in Eigen, recorded at eigen.tuxfamily.org/bz/show_bug.cgi?id=632
Mar
26
comment How to add an eigen SparseMatrix with an eigen dense Matrix?
The command "x.addTo(z)" can also be written as "z += x".
Dec
7
awarded  Good Answer
Aug
14
comment Numerical precision for difference of squares
I do think there is a difference. Relative error will give more weight to when the result is small (cos_theta close to +1 or -1), which is when I expect trouble for method 1.
Aug
14
answered Numerical precision for difference of squares
Aug
10
awarded  Yearling
May
3
answered Calculating an integral of two numerical solutions of an ode
Apr
3
comment Most efficient way to solve SEVERAL linear systems Ax=b with SMALL A (minimum 3x3 maximum 8x8)
There is indeed a speed versus accuracy trade-off, also for Cramer's rule - I forgot to mention that.
Apr
2
answered Most efficient way to solve SEVERAL linear systems Ax=b with SMALL A (minimum 3x3 maximum 8x8)
Mar
11
answered Add row and column at zero position in matrix Eigen
Feb
20
comment How to convert row vector to column vector in Eigen?
I added an assert to the development branch of Eigen to guard against this (mis)use.
Feb
5
awarded  Informed
Feb
4
answered Why two similar floating-point computation are giving two different results?
Jan
14
answered map eigen::matrixXf to array
Aug
19
comment Mapping array back to an existing Eigen matrix
@Manolete Yes, that should work