Given a huge symmetric positive definite matrix, how to calculate a few diagonal elements of its inverse?

Update: This is a pure Fortran question now; I put the maths stuff on M.SE.

Consider a `P`x`P` symmetric and positive definite matrix `A` (P=70000, i.e. `A` is roughly 40 GB using 8-byte doubles). We want to calculate the first three diagonal elements of the inverse matrix `inv(A)[1,1]`, `inv(A)[2,2]` and `inv(A)[3,3]`.

I have found this paper by James R. Bunch who seems to solve this exact problem without calculating the full inverse `inv(A)`; unfortunately he uses Fortran and LINPACK, both of which I've never used.

I'm trying to understand this function:

``````    SUBROUTINE SOLVEJ(A,LDA,P,Y,J)
INTEGER LDA,P,J
REAL A(LDA,1),Y(1)
C
INTEGER K
Y(J) = 1/A(J,J)
DO 10 K = J + 1,P
Y(K) = - SDOT(K - J,A(J,K),1,Y(J),1)/A(K,K)
10 CONTINUE
RETURN
END
``````

where `A` is a matrix of size LDA x P and `Y` is a vector of length P.

Can you explain why he defines `Y(1)` in the function head but then assigns to `Y(J)`? Does Fortran just not care about the size of the defined array and lets you access beyond its end? Why not define `Y(P)`, which seems possible according to this Fortran Primer?

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It looks like LAPACK is indeed integrated into MATLAB; see this press release. A lot of basic matrix operations such as `mldivide` `lu`, `qr`, etc, are called from LAPACK. –  Dang Khoa Sep 13 '11 at 21:49
Dunno if you found this list of LAPACK/LINPACK functions, could be helpful in reading that paper. Looks like a lot of this is based on a Cholesky decomposition. –  Dang Khoa Sep 13 '11 at 21:54
@strictly: Yes, MATLAB uses LAPACK for a lot of calculations; but my question is about the two functions I cite above and whether they are part of LAPACK. I have searched the docs but not found them, so I fear the answer in no. –  Jonas Heidelberg Sep 13 '11 at 21:58
that question hurts my brain. how about math.stackexchange.com ? –  Karoly Horvath Sep 13 '11 at 22:27
@yi_H I was wondering which of the two would be better. Since I felt more unsure about the Fortran side of things and I was looking for information about implementations of this thing, I felt SO to be the better site... but feel free to propose it be transferred! –  Jonas Heidelberg Sep 13 '11 at 22:35

First, you should be aware of the different Fortran versions, especially 77 VS 90/95 and beyond, and that indeed you can (normally) go out of bounds just like in C. Arrays in fortran can cause a lot of confusion, and I would say that it's a bit of a mess. To limit the discussion to your specific case, we can use the fact that this is about a dummy array, which is an array that appears in the dummy argument list of a procedure. For dummy arrays, we can have 3 types:

1. explicit shape: dimensions are explicitly declared
2. assumed-shape: no dimensions given, only colons to denote the rank of the array
3. assumed-size: last dimension is an asterisk, leading dimensions are explicitly declared

To complicate things, (3) can be grouped with (1), and (2) is usually grouped with deferred-shape arrays, such as e.g. allocatable arrays. The deferred-shape and assumed-shape is only for Fortran 90/95 and beyond and requires an explicit interface if you want to use them as dummy arguments, so it's typically used in a module.

So, in your case, while `Y(1)` works because you can go out of bounds, it's very bad since the program will fail when you would compile it with `-fcheck=bounds`. One should write either the valid Fortran 77:

``````REAL A(LDA,*),Y(*)
``````

or, much better:

``````REAL A(LDA,P),Y(P)
``````
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IIRC the use of 1 for the bounds rather than * is a left-over from Fortran 66, which didn't have *. –  janneb Sep 14 '11 at 9:17
Thanks for the explanation. I've tried to google for "dummy array" and "dummy argument" - do I understand it correctly that in Fortran a "dummy argument" is one where the caller provides memory which is then filled by the called function? –  Jonas Heidelberg Sep 14 '11 at 10:02
@Jonas Heidelberg: No, "dummy argument" is the term used when referring to an argument inside a procedure. The actual argument is the actual data that gets associated with the dummy argument on procedure entry. Roughly speaking, see the standard for a proper definition. –  janneb Sep 14 '11 at 10:21
@janneb: thanks for the historical context –  steabert Sep 14 '11 at 11:38
@Jonas Heidelberg - Try to think of dummy arguments as "placeholders" for actual data. –  Rook Sep 14 '11 at 15:06