Computational Physics: Trivial & Non-Trivial Solutions, LCAO

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SUMMARY

This discussion clarifies the distinction between trivial and non-trivial solutions in the context of computational physics, specifically relating to molecular orbitals and atomic orbitals. A trivial solution is defined as the zero function or vector, while non-trivial solutions are those of interest in solving differential equations. The Linear Combination of Atomic Orbitals (LCAO) is expressed as Ψ = ∑crΦr, where Ψ represents molecular orbitals, c denotes coefficients, and Φ signifies atomic orbitals. The basis sets refer to atomic functions when discussing atomic orbitals and molecular orbitals when discussing molecules.

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sams
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Dear Everyone,

1. Could anyone please explain what is meant by trivial and non-trivial solutions?

2. LCAO:
Ψ = ∑crΦr
Ψ: Molecular orbitals
c: coefficients
Φ: Atomic orbitals
When we talk about basis sets, do we mean here the coefficients or the atomic functions?

Thanks a lot...
 
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sams said:
1. Could anyone please explain what is meant by trivial and non-trivial solutions?
http://www.mathwords.com/t/trivial.htm
As far as my experience is concerned, trivial solution is the zero function or vector.
sams said:
When we talk about basis sets, do we mean here the coefficients or the atomic functions?
That depends on which you are talking about, molecule or atom. If the former, then the molecular orbitals are the basis if the latter it's the atomic orbital.
 
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When we solve for solutions to differential equations, in physics we are often only interested in nontrivial solutions. I'm not certain of this, but it is my intuition that the space containing the solutions contain some form of a zero element. Physically, we are uninterested in these trivial solutions. So we disregard them.
 
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