[The following paragraph is effective for audits of fiscal years beginning on or after December 15, 2010. Paragraph .05 describes the procedure to be followed when a subsequent event occurring after the report date is disclosed in the financial statements.
Note: When performing an integrated audit of financial statements and internal control over financial reporting, the auditor's reports on the company's financial statements and on internal control over financial reporting should be dated the same date.
However, if the financial statements are adjusted and disclosure of the event is made, or if no adjustment is made and the auditor qualifies his or her opinion, the procedures set forth in paragraph .05 should be followed.
[As amended, effective September 2002, by Statement on Auditing Standards No.
Sponsored Products are advertisements for products sold by merchants on For example you can be a citizen of the United States and also a citizen from England, therefore you will have double citizenship with the U. Not every country allows double citizenship, some countries ask you to choose and keep only one citizenship but in general the good news is that the U. allows or doesn't oppose double citizenship, however there are certain exceptions. When ordering this FAQ package you can learn the answer to many of the frequently asked questions about dual citizenship. Dual national s owe allegiance to both the United States and their foreign country of second citizenship. There are several benefits by having two nationalities but at the same time there can be some issues between the two countries laws and obligations. government allows dual citizenship, however United States laws do not mention dual citizenship. residents and citizens wonder if they can keep their original citizenship and still become a U. In a paper that I´m reading it states the following: If the representation $\rho$ is self-dual then the $G$-invariants are trivial if and only if the $G$-coinvariants are trivial. Any non-zero $G$ equivariant map from the trivial representation into $V$ can be dualized to get a $G$ equivariant map from $V^*$ to the trivial representation, and you can dualize again to get back what you started.In particular this says that the space of invariants of $V$ is the same as the space of coinvariants of $V^*$, so if one is trivial than so is the other.