文件名称:solver_1delay_dualstability_joint_mpoly2013
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DelayTools/Linear v.04 - solver_delay_nd
This program determines stablity of a linear differential equation with a
a single delay, where \dot{x}(t)=A0x(t)+A{1}x(t-tau(1))+...+A{K}x(t-tau(K))
where A0, A{i}, and tau(i) are user inputs.
Inputs: A{i} - these can be arbitrary square matrices of arbitrary
dimension. However, the higher the higher the dimension of A{i},
the more time the program will take to run
tau(i) - These can be an arbitrary sequence of positive increasing
numbers.
orderth - This input controls the accuracy of the results. For
most problems, orderth=2 should be sufficient to obtain a
reasonable degree of accuracy. Note: orderth should be an even
integer.- DelayTools/Linear v.04 - solver_delay_nd
This program determines stablity of a linear differential equation with a
a single delay, where \dot{x}(t)=A0x(t)+A{1}x(t-tau(1))+...+A{K}x(t-tau(K))
where A0, A{i}, and tau(i) are user inputs.
Inputs: A{i} - these can be arbitrary square matrices of arbitrary
dimension. However, the higher the higher the dimension of A{i},
the more time the program will take to run
tau(i) - These can be an arbitrary sequence of positive increasing
numbers.
orderth - This input controls the accuracy of the results. For
most problems, orderth=2 should be sufficient to obtain a
reasonable degree of accuracy. Note: orderth should be an even
integer.
This program determines stablity of a linear differential equation with a
a single delay, where \dot{x}(t)=A0x(t)+A{1}x(t-tau(1))+...+A{K}x(t-tau(K))
where A0, A{i}, and tau(i) are user inputs.
Inputs: A{i} - these can be arbitrary square matrices of arbitrary
dimension. However, the higher the higher the dimension of A{i},
the more time the program will take to run
tau(i) - These can be an arbitrary sequence of positive increasing
numbers.
orderth - This input controls the accuracy of the results. For
most problems, orderth=2 should be sufficient to obtain a
reasonable degree of accuracy. Note: orderth should be an even
integer.- DelayTools/Linear v.04 - solver_delay_nd
This program determines stablity of a linear differential equation with a
a single delay, where \dot{x}(t)=A0x(t)+A{1}x(t-tau(1))+...+A{K}x(t-tau(K))
where A0, A{i}, and tau(i) are user inputs.
Inputs: A{i} - these can be arbitrary square matrices of arbitrary
dimension. However, the higher the higher the dimension of A{i},
the more time the program will take to run
tau(i) - These can be an arbitrary sequence of positive increasing
numbers.
orderth - This input controls the accuracy of the results. For
most problems, orderth=2 should be sufficient to obtain a
reasonable degree of accuracy. Note: orderth should be an even
integer.
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solver_1delay_dualstability_joint_mpoly2013.m