Proofs of several OEIS conjectures on determinants and permanents
Pith reviewed 2026-06-27 19:35 UTC · model grok-4.3
The pith
Several OEIS conjectures on determinants and permanents of Toeplitz, cross, and Kronecker matrices are proved via row operations and block formulas.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We prove several conjectures recorded in the On-Line Encyclopedia of Integer Sequences. The conjectures considered here concern determinants and permanents of special matrices, such as Toeplitz matrices, cross matrices, Kronecker powers of matrices, and matrices whose entries are defined by powers of differences. As tools we use row and column operations, block determinant formulas, Cauchy determinants, Sylvester's determinant theorem, and LU-factorizations. We also obtain closed-form formulas for several related integer sequences for which no such formulas were conjectured.
What carries the argument
Row and column operations combined with block determinant formulas, Cauchy determinants, Sylvester's theorem, and LU-factorizations applied to the special matrices.
If this is right
- The conjectured determinant and permanent values for the Toeplitz and cross matrices are correct.
- Determinants of Kronecker powers of the matrices equal the expressions established in the proofs.
- Matrices with entries defined by powers of differences have determinants matching the conjectured formulas.
- Closed-form expressions are now available for additional related integer sequences.
- The same linear algebra techniques confirm the sequences generated by these matrices.
Where Pith is reading between the lines
- The established formulas allow direct evaluation of the sequences for large matrix orders without constructing or factoring the full matrix.
- Similar row and block operation methods could be tested on other patterned matrices that appear in OEIS but lack proofs.
- The closed forms may reveal combinatorial interpretations or generating-function relations for the underlying sequences.
- Extensions to permanents of additional matrix families could follow by adapting the LU-factorization approach.
Load-bearing premise
The matrix definitions and sequence indices stated in the OEIS entries match exactly those used in the proofs.
What would settle it
Direct computation of the determinant or permanent for a specific small matrix size that yields a value different from the conjectured closed form.
read the original abstract
We prove several conjectures recorded in the On-Line Encyclopedia of Integer Sequences. The conjectures considered here concern determinants and permanents of special matrices, such as Toeplitz matrices, cross matrices, Kronecker powers of matrices, and matrices whose entries are defined by powers of differences. As tools we use row and column operations, block determinant formulas, Cauchy determinants, Sylvester's determinant theorem, and $LU$-factorizations. We also obtain closed-form formulas for several related integer sequences for which no such formulas were conjectured.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper proves several conjectures from the OEIS on the determinants and permanents of special matrices, including Toeplitz matrices, cross matrices, Kronecker powers of matrices, and matrices with entries defined by powers of differences. Proofs are obtained via row and column operations, block determinant formulas, Cauchy determinants, Sylvester's determinant theorem, and LU factorizations. Closed-form formulas are also derived for several related integer sequences where no conjectures had been recorded.
Significance. If the proofs hold, the work resolves multiple open OEIS conjectures in combinatorial matrix theory, supplies explicit closed forms, and demonstrates the applicability of classical linear-algebra tools to these matrix families. The absence of free parameters, ad-hoc constructions, or fitted quantities, together with the use of deterministic named theorems, makes the results reproducible and falsifiable by direct verification against the OEIS entries.
minor comments (2)
- The introduction would benefit from an explicit enumerated list of the OEIS entries (A-numbers) treated in each section so that readers can immediately match the proved formulas to the conjectures.
- Notation for the matrix families (e.g., the precise definition of the 'cross matrix' and the range of the power-of-difference parameter) should be stated once in a preliminary section rather than repeated inline.
Simulated Author's Rebuttal
We thank the referee for their positive assessment of the manuscript and for recommending acceptance. The referee's summary correctly identifies the main results and the classical tools employed.
Circularity Check
No significant circularity identified
full rationale
The paper provides explicit proofs of OEIS conjectures on determinants and permanents of Toeplitz, cross, Kronecker, and power-of-difference matrices. It relies on standard external tools (row/column operations, block determinant formulas, Cauchy determinants, Sylvester's theorem, LU factorizations) whose application does not reduce to any self-definition, fitted input renamed as prediction, or self-citation load-bearing step. No equations equate a claimed result to its own inputs by construction, and the central claims remain independent of any author-overlapping citations.
Axiom & Free-Parameter Ledger
axioms (1)
- standard math Standard theorems of linear algebra (Cauchy determinant formula, Sylvester's determinant theorem, block determinant identities) hold.
Reference graph
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discussion (0)
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